Thin sequences and their role in \(H^p\) theory, model spaces, and uniform algebras
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Publication:888922
DOI10.4171/RMI/856zbMath1333.30067arXiv1312.5759OpenAlexW2963316145MaRDI QIDQ888922
Brett D. Wick, Pamela Gorkin, Sandra Pott
Publication date: 3 November 2015
Published in: Revista Matemática Iberoamericana (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1312.5759
Related Items (3)
Schur-Nevanlinna parameters, Riesz bases, and compact Hankel operators on the model space ⋮ Thin Interpolating Sequences ⋮ Thin sequences and their role in model spaces and Douglas algebras
Cites Work
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- Carleson potentials and the reproducing kernel thesis for embedding theorems
- \(L^\infty\) estimates for the \(\bar\partial\) problem in a half-plane
- Divisibility in Douglas algebras
- A characterization of Douglas subalgebras
- Subalgebras of \(L^\infty\) containing \(H^\infty\)
- Interpolating sequences and separation properties
- Factorization of \(L^\infty\) functions
- Functional models and asymptotically orthonormal sequences.
- The constant of interpolation
- Isolated points and essential components of composition operators on 𝐻^{∞}
- Free interpolation by nonvanishing analytic functions
- ASYMPTOTIC INTERPOLATING SEQUENCES IN UNIFORM ALGEBRAS
- Algebras of functions on the unit circle
- On Some Interpolation Problems for Analytic Functions
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